Standard Monomials of 1-Skeleton Ideals of Graphs and Their Signless Laplace Matrices

Abstract

Let G be a (multi) graph on the vertex set V=\0,1,… ,n\ with root 0. The G-parking function ideal MG is a monomial ideal in the polynomial ring R=K[x1,… ,xn] over a field K such that K(RMG)=(LG), where LG is the truncated Laplace matrix of G and ( LG) is the determinant of LG. In other words, standard monomials of the Artinian quotient RMG correspond bijectively with the spanning trees of G. For 0≤ k≤ n-1, the k-skeleton ideal MG(k) of G is the monomial subideal MG(k)= mA:≠ A⊂eq[n] and |A|≤ k+1 of the G-parking function ideal MG= mA : ≠ A⊂eq[n]⊂eq R. For a simple graph G, Dochtermann conjectured that K(RMG(1))≥(QG), where QG is the truncated signless Laplace matrix of G. We show that Dochtermann conjecture holds for any (simple or multi) graph G on V.